Reliability Analysis of a Discrete Life Time Model

Sandeep Kumar; Birjesh Kumar; Alka Chaudhary

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Reseach Article

Reliability Analysis of a Discrete Life Time Model

by Sandeep Kumar, Birjesh Kumar, Alka Chaudhary

International Journal of Computer Applications

Foundation of Computer Science (FCS), NY, USA

Volume 86 - Number 10

Year of Publication: 2014

Authors: Sandeep Kumar, Birjesh Kumar, Alka Chaudhary

10.5120/15024-3313

Sandeep Kumar, Birjesh Kumar, Alka Chaudhary . Reliability Analysis of a Discrete Life Time Model. International Journal of Computer Applications. 86, 10 ( January 2014), 35-39. DOI=10.5120/15024-3313

@article{ 10.5120/15024-3313,

author = { Sandeep Kumar, Birjesh Kumar, Alka Chaudhary },

title = { Reliability Analysis of a Discrete Life Time Model },

journal = { International Journal of Computer Applications },

issue_date = { January 2014 },

volume = { 86 },

number = { 10 },

month = { January },

year = { 2014 },

issn = { 0975-8887 },

pages = { 35-39 },

numpages = {9},

url = { https://ijcaonline.org/archives/volume86/number10/15024-3313/ },

doi = { 10.5120/15024-3313 },

publisher = {Foundation of Computer Science (FCS), NY, USA},

address = {New York, USA}

}

%0 Journal Article

%1 2024-02-06T22:03:53.378002+05:30

%A Sandeep Kumar

%A Birjesh Kumar

%A Alka Chaudhary

%T Reliability Analysis of a Discrete Life Time Model

%J International Journal of Computer Applications

%@ 0975-8887

%V 86

%N 10

%P 35-39

%D 2014

%I Foundation of Computer Science (FCS), NY, USA

Abstract

Several studies deals with life testing of various systems with respect to Reliability characteristics. The life testing generally considered a continuous life time Distribution. However, there are situations when life times are recorded on discrete scale. In life testing, Geometric distribution has an important role in such type of analysis. A vast literature on the life testing plans in the Bayesian framework is also available where the parameter of basic life time distribution is considered as a random variable. The present study deals with the development of the methodology for life testing in terms of classical, modified classical and Bayes Reliability.

References

Martz, H. F. and Wallher, R. A. (1982): "Bayesian Reliability Analysis", John Willy, New York.
Bhattacharya, S. K. (1967): "Bayesian Approach to life-testing and reliability estimation", JASA, 26, PP. 48-62
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G. G. Brush, H. Cautin and B. R. Lewin (1981): ''Outgoing quality distributions for MIL-STD-105 D sampling plans'', Journal of Quality Technology, 13, 254-263.
K. K. Sharma and R. K. Bhutani, (1992 c): ''A comparison of classical and Bayes risks when the quality varies randomly", Microelectron Reliability, Vol. 32, No. 4, pp. 493-495.
Sharma, K. K. and Bhutani, R. K. (1993): "Bayesian analysis of system availability", Microelectron Reliab. , 33, 6, 809-811.
Sharma, K. K. and Bhutani, R. K. (1992): "A comparison of classical and Bayes risk", Ind. Appl. Statistics, 1, 27-36.
Sharma, K. K. and Bhutani, R. K. (1994): "Bayesian analysis series system", Microelectron Reliab. , 34, 4, 761-763.
Sharma, K. K. and Krishna, Hare (1994): "Bayesian reliability analysis of k-out-of-m system and the estimation of sample size and censoring time", RESS, 44, 11-15.
Box,G. E. P. and Tiao(1973),"Bayesian inference in statistical analysis.
Bazovsky, I. (1961), "Reliability theory and practice", Practice Hall, New Jersey.

Index Terms

Computer Science

Information Sciences

Keywords

Classical Component Reliability ( CCR) Modified Classical Component Reliability(CCR*) Bayes Component Reliability(B C R).